Method and an apparatus for measuring high-frequency intermodulation products

ABSTRACT

Novel excitation signals are specifically designed for testing a nonlinear device-under-test such that all of the desired intermodulation products are measurable after being converted by a sampling frequency convertor. This is achieved by using excitation frequencies which are equal to an integer multiple of the sampling frequency of the sampling frequency convertor plus or minus small frequency offsets. The offset frequencies are carefully choosen such that the frequencies of all the significant intermodulation products after being converted by the sampling frequency convertor are within the bandwidth of the sampling frequency convertor output.

CROSS-REFERENCE TO RELATED APPLICATIONS

This application is entitled to the benefit of Provisional Application Ser. No. 60/673,889, filed on Apr. 19^(th), 2005.

FEDERALLY SPONSORED RESEARCH

Not Applicable

SEQUENCE LISTING OR PROGRAM

Not Applicable

BACKGROUND OF THE INVENTION

1. Field of Invention

The present invention relates to a method and an apparatus to characterize the behaviour of high-frequency devices-under-test (DUTs) under large-signal operating conditions.

2. Description of the Related Art

In “The Return of the Sampling Frequency Converter,” 62nd ARFTG Conference Digest, USA, December 2003, Jan Verspecht explains how sampling frequency converters are used in “Large-Signal Network Analyzers” (LSNAs) in order to characterize the behaviour of high-frequency devices-under-test (DUTs). It is explained in the above reference that the measurement capabilities of any prior art LSNA are limited to the use of periodic signal excitations and periodically modulated carrier signals. The above excitation signals are often sufficient for a practical characterization of microwave amplifier components. This limitation makes it impossible, however, to measure all of the significant intermodulation products which are typically generated between a local oscillator signal and a radio-frequency (RF) signal at the signal ports of a mixer. As such the prior art LSNA can in general not be used for the characterization of mixers.

BRIEF SUMMARY OF THE INVENTION

With the present invention one will apply novel excitation signals that are specifically designed such that all of the desired intermodulation products will be measurable after being converted by the sampling frequency convertor of the LSNA. This new method allows to measure all of the relevant intermodulation products that are needed to characterize fundamental and harmonic mixers. This is achieved by using excitation frequencies which are equal to an integer multiple of the local oscillator frequency of the sampling frequency convertor plus or minus small frequency offsets. The offset frequencies are carefully choosen such that the frequencies of all the significant intermodulation products can easily be measured after being converted by the sampling frequency convertor.

BRIEF DESCRIPTION OF THE DRAWINGS

FIG. 1 Schematic of an LSNA

DETAILED DESCRIPTION

For reasons of simplicity a three-port Large-Signal Network Analyzer (LSNA) is used in the following to illustrate the method of this invention. Extensions to more signal ports or simplifications whereby signal ports are being eliminated can easily be derived. In general an LSNA is used to measure the travelling voltage waveforms as they occur at the signal ports (1), (2) and (3) of a high-frequency device-under-test (4) (DUT) under a large signal excitation. In FIG. 1 the DUT (4) is a mixer with an RF input signal port (2), a local oscillator input port (1) and with an intermediate frequency signal port (3). The RF signal is generated by a synthesizer (5) and the local oscillator signal is generated by a second synthesizer (6). The intermediate frequency signal port is terminated in an impedance (7).

The bandwidth of the signals which are used for an LSNA characterization may be as high as 50 GHz. In order to measure these high-frequency signals, they are sensed by a test-set (8) that usually contains several couplers (9), (10), (11), (12), (13) and (14). The sensed signals, which are related to the travelling voltage waves as they appear in both directions of the signal ports (1), (2) and (3) are send to the input ports of a sampling frequency convertor (15). The sampling frequency convertor (15) converts all of the frequencies to a lower frequency bandwidth, typically in the MHz range. The converted signals are then digitized by an analog-to-digital convertor (16). The complex values of the spectral components are calculated by a digital signal processor (17). The signal processor (17) performs time to frequency domain transformations and performs all of the calculations that are used for calibration of the data.

In prior art one starts by choosing the fundamental frequency of the excitation signal, which is noted f_(c). Next one calculates a sampling frequency f_(S) that is used by the LSNA sampling downconvertor. The frequency f_(S) is chosen such that the sampled high-frequency signal is converted into an a piori determined lower intermediate frequency, noted f_(if). The relationship between f_(s), f_(c) and f_(if) is given by f_(if)=Modulo(f_(c), f_(s)).  (1)

In equation (1) Modulo(x, y) refers to the remainder of x divided by y. This procedure requires that the downconverter sampling frequency f_(S) is variable and can be set with a high precision. As explained in the “The Return of the Sampling Frequency Converter,” 62nd ARFTG Conference Digest, USA, December 2003, Jan Verspecht the measurement capability of any prior art LSNA that is based on the above explained principle is limited to the use of pure periodic excitations and periodically modulated carrier signals.

With the present invention one will use a different approach that allows to extend the applicability of an LSNA to mixer applications. Consider a sampling downconverter with a fixed sampling frequency f_(s). Suppose that one wants to measure the intermodulation products that are generated by a DUT that is excited by a set of multitone signals that contain spectral components at the frequencies f₁, f₂, . . . ,f_(N). In stead of calculating a sampling frequency which will result in a set of measurable intermediate frequencies at the output of the sampling frequency convertor, one will keep f_(S) constant and one will slightly shift the frequencies of the multitone excitation signals to a corresponding set of new frequencies g₁, g₂, . . . , g_(N) such that (1) is valid for “i”going from 1 to N, with P_(i) an integer number. g _(i) =P _(i) .f _(s) +Δf _(i)  (1)

In other words, one will shift each excitation frequency such that it has a frequency offset Δf_(i) relative to an integer multiple of the sampling frequency f_(S). The value of Δf_(i) is typically much smaller than the value f_(s). In the following will be explained how a good value for Δf_(i) can be chosen.

Consider that one wants to measure the complex value of an intermodulation product of a specific order with respect to each of the excitation frequencies g_(i). This order is indicated by the set of integer coefficients k_(i). The frequency of this intermodulation product, noted f_(IP)[k₁,k₂, . . . ], is given by f _(IP) [k ₁ ,k ₂ , . . . ]=k ₁ .g ₁ +k ₂ .g ₂ + . . . +k _(N) .g _(N)  (2) Substitution of (1) in (2) and a rearrangement of the terms results in the following. f _(IP) [k ₁ ,k ₂, . . . ]=(k ₁ .P ₁ +k ₂ .P ₂ + . . . +k _(N) .P _(N)).f _(S)+(k ₁ .Δf ₁ +k ₂ .Δf ₂ + . . . +k _(N) .Δf _(N))  (3)

The values of Δf_(i) are chosen such that the value of the linear combination (k₁.Δf₁+k₂.Δf₂+ . . . +k_(N).Δf_(N)) is within the output bandwidth of the sampling frequency convertor. As a result the intermodulation product with frequency f_(IP)[k₁,k₂, . . . ] will appear at the output of the sampling frequency convertor at a specific frequency, noted f_(IF)[k₁,k₂, . . . ], that is given by: f _(IF) [k ₁ ,k ₂, . . . ]=Mod(f _(IP) [k ₁ ,k ₂ , . . . ], f _(S))=k ₁ .Δf ₁ +k ₂ .Δf ₂ + . . . +k _(N) .Δf _(N)  (4) It will always be possible to choose the values of Δf_(i) such that the above is valid for a whole range of significant intermodulation products. One will further choose the values Δf_(i) such that the resulting linear combinations result in a set of frequencies which can easily be characterized by the analog-to-digital convertor (15). The set of frequencies Δf_(i) will e.g. be chosen such that there is a minimum distance between any two frequency converted intermodulation products. This avoids interference between two spectral components caused by phase noise. One can also choose Δf_(i) such that all intermodulation products fall on an exact bin of the discrete Fourier transform as calculated by the digital signal processor (17).

Note that in practice the difference between g_(i) and f_(i) can be made sufficiently small such that one will be able to characterize the travelling voltage waveforms as they occur at the DUT signal ports under conditions which are close enough to the desired operating conditions in order to extract the desired information of the DUT.

The following example illustrates the above.

Consider that one wants to measure the intermodulation products up to the 4^(th) order at the signal ports of a mixer with a local oscillator frequency (f₁) of 10 GHz and an RF signal frequency (f₂) of 9.9 GHz. Further suppose that f_(S) equals 20 MHz and that the output bandwidth of the sampling frequency convertor is 4 MHz.

One starts by choosing P₁=500, Δf₁=1 MHz, P₂=495 and Δf₂=0.99 MHz.

This results in actually applied frequencies given by g₁=10.001 GHz (for the local oscillator signal) and g₂=9.90099 GHz (for the RF signal). Note that the deviation between the ideal frequencies and the actual applied frequencies is only 0.01%. The first two columns of Table 1 represent the respective k₁ and k₂ indices, the third column gives the actual RF frequencies of the respective intermodulation product up to the 4^(th) order, and the second column gives the corresponding frequencies as they appear at the output of the sampling frequency convertor. Note that only positive frequencies are being considered.

As can be concluded from Table 1, all of the considered intermodulation products appear at the output of the sampling frequency convertor at a frequency within the convertor output bandwidth of 4 MHz and with a minimum separation between any two tones of 10 kHz. This result was achieved by carefully choosing Δf₁ and Δf₂. The difference between the desired frequencies f, and f₂ and the actual frequencies g₁ and g₂ is minimized by carefully choosing the values P₁ and P₂.

Note that for the example above the ratio between Δf₁ and Δf₂ was chosen to be exactly the same as the ratio between f₁ and f₂. This is convenient but it is not necessary. The advantage is that, in this case, the ratio between any two intermodulation frequencies is exactly the same before and after frequency conversion. As a result the time domain waveforms at the output of the sampling frequency convertor are copies of the actual RF time domain waveforms where the only difference is in the time scales. TABLE 1 Intermodulation Product Indices and Corresponding Frequencies k₁ k₂ f_(IP)[k₁, k₂] f_(IF)[k₁, k₂] −1  2 9.80098 GHz 980 kHz −1  3 19.70197 GHz 1970 kHz 0 0 0 GHz 0 kHz 0 1 9.90099 GHz 990 kHz 0 2 19.80198 GHz 1980 kHz 0 3 29.70297 GHz 2970 kHz 0 4 39.60396 GHz 3960 kHz 1 −1  0.10001 GHz 10 kHz 1 0 10.00100 GHz 1000 kHz 1 1 19.90199 GHz 1990 kHz 1 2 29.80298 GHz 2980 kHz 1 3 39.70397 GHz 3970 kHz 2 −2  0.20020 GHz 20 kHz 2 −1  10.10101 GHz 1010 kHz 2 0 20.00200 GHz 2000 kHz 2 1 29.90299 GHz 2990 kHz 2 2 39.80398 GHz 3980 kHz 3 −1  20.10201 GHz 2010 kHz 3 0 30.00300 GHz 3000 kHz 3 1 39.90399 GHz 3990 kHz 4 0 40.00400 GHz 4000 kHz 

1. A method for measuring high-frequency intermodulation products that are generated by a device-under-test comprising the steps of: applying multitone excitation signals to the signal ports of said device-under-test sensing and frequency converting the excitation and response signals of said device under-test by sampling said signals using a sampling frequency convertor that samples at a specific sampling rate, whereby said multitone excitation signals contain spectral components at a discrete set of frequencies; and whereby the response signals contain intermodulation products with significant power upto a specific order; and whereby each of said frequencies of said discrete set is equal to an integer multiple of said sampling rate plus or minus a frequency offset that is substantially smaller than said sampling rate; and whereby said frequency offsets are chosen such that the frequencies of the response signals appearing at the output of said sampling frequency convertor are within the output bandwidth of said sampling frequency convertor.
 2. The method described in 1 whereby said frequency offsets are chosen such that the minimum distance between any two frequencies at said output of said sampling frequency convertor is larger than a predetermined frequency resolution.
 3. The method described in 1 whereby each of said small frequency offsets is proportional to the corresponding frequency of said multitone excitation signal. 